After spending tens, hundreds, thousands of hours researching, check and collect your ancestors, you decide finally to print the results of your work. It is at this moment, you realize that you can not get a part of your family tree, never the whole. Two solutions are possible: Either you settle for "classic" trees available, or you decide to give you a tree "Wellbert".

A family tree " Wellbert " is a "classic" tree on which we add individuals or to chosen places, either to all the possible places.

The "classic" trees represented here are the ones that you can obtain with a software of genealogy (free or paying).

Whatever the quality of your genealogy software, it will never offer you three types of trees: ancestry, descent or mixed.

The "classic" tree obtained with your personal software is only the starting point of a tree " Wellbert ".

That is why a family tree " Wellbert " will always be more complete than another tree. Explanations in images:

-------------- Tree of ancestry--------------

Wellbert can add individuals to any place (according to your instructions). In every addition, the tree is reorganized in a dynamic way.

Tree of ancestry "Classic"

Tree of ancestry "Wellbert"

--------------Family tree of descendants--------------

Wellbert adds individuals and/or branches to any place (according to your instructions). In every addition, the tree is reorganized in a dynamic way. Blocks superimposed couples are transformed into blocks separate couples. This type of tree allows to represent the maximum of people on the same plan, while preserving a fluid, readable and orderly aspect. The only limit in the additions is of visual order: two links cannot overlap.

Family tree of descendants "Classic"

Family tree of descendants "Wellbert"

--------------Mixed family tree--------------

Wellbert adds individuals and/or branches to any place (according to your instructions). In every addition, the tree is reorganized in a dynamic way. Blocks superimposed couples are transformed into blocks separate couples. This type of tree allows to represent the maximum of people on the same plan, while preserving a fluid, readable and orderly aspect. The only limit in the additions is of visual order: two links cannot overlap.